I. A. Ibragimov, R. Z. Khas'minskii, “Asymptotical behavior of some statistical estimators in the smooth case. I. Study of the likelihood ratio”, Teor. Veroyatnost. i Primenen., 17:3 (1972), 469–486; Theory Probab. Appl., 17:3 (1973), 445

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Teoriya Veroyatnostei i ee Primeneniya, 1972, Volume 17, Issue 3, Pages 469–486 (Mi tvp2659)

This article is cited in 50 scientific papers (total in 51 papers)

Asymptotical behavior of some statistical estimators in the smooth case. I. Study of the likelihood ratio

I. A. Ibragimov^a, R. Z. Khas'minskii^b

^a Leningrad
^b Moscow

Full-text PDF (930 kB) Citations (51)

Abstract: The paper considers properties of likelihood ratio determined by (1.1). We prove that the distributions in functional space

$\mathbf C_0$ , generated by the processes

$Z_n(\theta)$

$(-\infty<\theta<\infty)$ tend to the distribution in

$\mathbf C_0$ , generated by the process

$Z(\theta)$ defined by (2.1), provided conditions I–IV of section 1 are satisfied. As a consequence, we have asymptotical normality of the maximum likelihood estimator without assumptions of continuity of

$\log f(x,\theta)$ and existence of

$f''_{\theta\theta}(x,\theta)$ . We deduce several other consequences of this result useful in the second part of the paper.

Received: 05.01.1971

English version:
Theory of Probability and its Applications, 1973, Volume 17, Issue 3, Pages 445–462
DOI: https://doi.org/10.1137/1117054

Bibliographic databases:

Language: Russian

Citation: I. A. Ibragimov, R. Z. Khas'minskii, “Asymptotical behavior of some statistical estimators in the smooth case. I. Study of the likelihood ratio”, Teor. Veroyatnost. i Primenen., 17:3 (1972), 469–486; Theory Probab. Appl., 17:3 (1973), 445–462

Citation in format AMSBIB

\Bibitem{IbrKha72}

\by I.~A.~Ibragimov, R.~Z.~Khas'minskii

\paper Asymptotical behavior of some statistical estimators in the smooth case. I.~Study of the likelihood ratio

\jour Teor. Veroyatnost. i Primenen.

\yr 1972

\vol 17

\issue 3

\pages 469--486

\mathnet{http://mi.mathnet.ru/tvp2659}

\mathscinet{http://mathscinet.ams.org/mathscinet-getitem?mr=311008}

\zmath{https://zbmath.org/?q=an:0273.62019}

\transl

\jour Theory Probab. Appl.

\yr 1973

\vol 17

\issue 3

\pages 445--462

\crossref{https://doi.org/10.1137/1117054}

Linking options:

https://www.mathnet.ru/eng/tvp2659

https://www.mathnet.ru/eng/tvp/v17/i3/p469

Cycle of papers

Asymptotical behavior of some statistical estimators in the smooth case. I. Study of the likelihood ratio
I. A. Ibragimov, R. Z. Khas'minskii
Teor. Veroyatnost. i Primenen., 1972, 17:3, 469–486
Asymptotical behaviour of some statistical estimators. II. Limiting theorems for the a posteriory density and Bayesian estimators
I. A. Ibragimov, R. Z. Khas'minskii
Teor. Veroyatnost. i Primenen., 1973, 18:1, 78–93

This publication is cited in the following 51 articles:

Junichiro Yoshida, Nakahiro Yoshida, “Quasi-maximum likelihood estimation and penalized estimation under non-standard conditions”, Ann Inst Stat Math, 2024
Junichiro Yoshida, Nakahiro Yoshida, “Penalized estimation for non-identifiable models”, Ann Inst Stat Math, 76:5 (2024), 765
Nakahiro Yoshida, “Simplified quasi-likelihood analysis for a locally asymptotically quadratic random field”, Ann Inst Stat Math, 2024
A. A. Borovkov, Al. V. Bulinski, A. M. Vershik, D. Zaporozhets, A. S. Holevo, A. N. Shiryaev, “Ildar Abdullovich Ibragimov (on his ninetieth birthday)”, Russian Math. Surveys, 78:3 (2023), 573–583
Nakahiro Yoshida, “Quasi-likelihood analysis and its applications”, Stat Inference Stoch Process, 25:1 (2022), 43
Rudolf Ahlswede, Foundations in Signal Processing, Communications and Networking, 15, Probabilistic Methods and Distributed Information, 2019, 533
A. A. Zaikin, “Estimates with asymptotically uniformly minimal $d$ -risk”, Theory Probab. Appl., 63:3 (2019), 500–505
A. A. Zaikin, “Asymptotic expansion of posterior distribution of parameter centered by a $\sqrt n$ -consistent estimate”, J. Math. Sci. (N. Y.), 229:6 (2018), 678–697
Methodology in Robust and Nonparametric Statistics, 2012, 282
B. Hajek, V.G. Subramanian, “Capacity and reliability function for small peak signal constraints”, IEEE Trans. Inform. Theory, 48:4 (2002), 828
Shyang Chang, Yen-Ching Chang, Chen-Yu Chang, “A minimum discrepancy estimator in parameter estimation”, IEEE Trans. Inform. Theory, 44:7 (1998), 2930
Wiley Series in Probability and Statistics, Sequential Estimation, 1997, 445
V.V. Prelov, E.C. van der Meulen, “An asymptotic expression for the information and capacity of a multidimensional channel with weak input signals”, IEEE Trans. Inform. Theory, 39:5 (1993), 1728
I.V. Nikiforov, “Sequential Detection of Changes in Stochastic Processes”, IFAC Proceedings Volumes, 25:15 (1992), 11
Murray D. Burke, Edit Gombay, “The bootstrapped maximum likelihood estimator with an application”, Statistics & Probability Letters, 12:5 (1991), 421
Jan Hanousek, “Asymptotic relation of M- and P-estimators of location”, Computational Statistics & Data Analysis, 6:3 (1988), 277
Marc Moore, “Inférence statistique dans les processus stochastiques: Aperçu historique”, Can J Statistics, 15:3 (1987), 185
R.C. Phoha, “Asymptotic bayesian inference in some nonstandard cases: Bernstein–von Mises Results and regular bayes' estimators”, Statistics, 18:2 (1987), 259
G Kersting, “Second-order linearity of the general signed-rank statistic”, Journal of Multivariate Analysis, 21:2 (1987), 274
M. Basseville, A. Benveniste, G. Moustakides, “Detection and diagnosis of abrupt changes in modal characteristics of nonstationary digital signals (Corresp.)”, IEEE Trans. Inform. Theory, 32:3 (1986), 412

Citing articles in Google Scholar: Russian citations, English citations
Related articles in Google Scholar: Russian articles, English articles

Theory of Probability and its Applications

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